论文信息 - Embedding Steiner triple systems in hexagon triple systems

Embedding Steiner triple systems in hexagon triple systems

A hexagon triple is the graph consisting of the three triangles (triples) {a,b,c},{c,d,e}, and {e,f,a}, where a,b,c,d,e, and f are distinct. The triple {a,c,e} is called an inside triple. A hexagon triple system of order n is a pair (X,H) where H is a collection of edge disjoint hexagon triples which partitions the edge set of K"n with vertex set X. The inside triples form a partial Steiner triple system. We show that any Steiner triple system of order n can be embedded in the inside triples of a hexagon triple system of order approximately 3n.

Christopher A. Rodger | Charles C. Lindner | Gaetano Quattrocchi

[1] Charles J. Colbourn,et al. Minimum embedding of Steiner triple systems into (K4-e)-designs I , 2008, Discret. Math..

[2] N. Sauer,et al. Maximal Subsets of a given Set having No Triple in Common with a Steiner Triple System on the set , 1969, Canadian Mathematical Bulletin.

[3] Th. Skolem,et al. Some Remarks on the Triple Systems of Steiner. , 1958 .

[4] Alexander Rosa,et al. Embedding Steiner triple systems into Steiner systems S(2, 4, v) , 2004, Discret. Math..

[5] C. Lindner,et al. Design Theory , 2008 .

[6] Charles C. Lindner,et al. Perfect hexagon triple systems , 2004, Discret. Math..